The sum of two cubes problem -- an approach that's classroom friendly

Abstract

In this note I give simple proofs of classical results of Euler, Legendre and Sylvester showing that for certain integers M there are no (or only a few) solutions of x3 + y3 = M, with x and y in Q. The proofs all use a single argument -- infinite 3-descent in the ring O = Z[ω] of Eisenstein integers. (Everything needed about O is developed from scratch.) The reader only needs the briefest acquaintance with complex numbers, fields and congruence modulo an element of a commutative ring. In particular I never say anything about ideals or elliptic curves (though I do mention cubic reciprocity in passing), and a clever high-school student might well enjoy the note. A few new results with M in O and x and y in Q[ω] are also derived.